{
"cells": [
{
"cell_type": "markdown",
"id": "recreational-deployment",
"metadata": {
"slideshow": {
"slide_type": "slide"
}
},
"source": [
"# Brazilian Securities\n",
"\n",
"---\n",
"\n",
"### Wilson Freitas\n"
]
},
{
"cell_type": "markdown",
"id": "medieval-corporation",
"metadata": {
"slideshow": {
"slide_type": "slide"
}
},
"source": [
"# Brazilian Securities\n",
"\n",
"---\n",
"\n",
"### Wilson Freitas\n",
"\n",
"# Lecture 3\n",
"\n",
"\n",
"- U.S. Dollar Futures - DOL\n",
" - Dollar curve\n",
"- DI x U.S. Dollar Spread Futures - DDI\n",
"\t- Dirty DI x U.S. Dollar Spread curve\n",
"- Forward Rate Agreement on DI x U.S. Dollar Spread - FRC\n",
"\t- Clean DI x U.S. Dollar Spread curve\n"
]
},
{
"cell_type": "code",
"execution_count": 1,
"id": "alpha-compilation",
"metadata": {
"slideshow": {
"slide_type": "skip"
}
},
"outputs": [],
"source": [
"%load_ext autoreload\n",
"%autoreload 2"
]
},
{
"cell_type": "code",
"execution_count": 2,
"id": "surface-dressing",
"metadata": {
"slideshow": {
"slide_type": "slide"
}
},
"outputs": [],
"source": [
"import datetime\n",
"import pandas as pd\n",
"import numpy as np\n",
"import matplotlib.pyplot as plt\n",
"\n",
"from bcb import currency, sgs\n",
"import bizdays\n",
"\n",
"MARKET_CALENDAR = bizdays.Calendar.load('ANBIMA.cal')\n",
"ACTUAL_CALENDAR = bizdays.Calendar(name='actual')\n",
"\n",
"import myfuncs as my"
]
},
{
"cell_type": "markdown",
"id": "unable-staff",
"metadata": {
"slideshow": {
"slide_type": "slide"
}
},
"source": [
"## U.S. Dollar Futures - DOL\n",
"\n",
"- This trades the future values of exchange rates of Brazilian Reals (BRL) per U.S. Dollar (USD).\n",
" - The exchange rate (PTAX800) variation starting on the *preceding business day* and ending on the business day preceding the maturity.\n",
" - Price quotation is USD 1.000.\n",
"\n",
"- The unit price is defined as\n",
"\n",
"$$\n",
"PU_{DOL} = PTAX_{T-1} \\cdot 1000\n",
"$$\n",
"\n",
"where $PTAX_{T-1}$ is the expected value for the U.S. Dollar exchange rate at maturity.\n"
]
},
{
"cell_type": "code",
"execution_count": 3,
"id": "objective-curve",
"metadata": {
"slideshow": {
"slide_type": "skip"
}
},
"outputs": [],
"source": [
"df = pd.read_parquet('data/contracts_202109_202111.parquet').reset_index(drop=True)"
]
},
{
"cell_type": "code",
"execution_count": 4,
"id": "fitting-richardson",
"metadata": {
"slideshow": {
"slide_type": "slide"
}
},
"outputs": [],
"source": [
"dol = df[(df['Mercadoria'] == 'DOL') &\n",
" (df['DataRef'] == pd.to_datetime('2021-11-01'))].reset_index(drop=True)"
]
},
{
"cell_type": "code",
"execution_count": 5,
"id": "collected-cache",
"metadata": {},
"outputs": [],
"source": [
"dol['Maturity'] = dol['Vencimento'].map(MARKET_CALENDAR.following)\n",
"dol['DU'] = list(MARKET_CALENDAR.vec.bizdays(dol['DataRef'], dol['Maturity']))\n",
"dol['DC'] = list(ACTUAL_CALENDAR.vec.bizdays(dol['DataRef'], dol['Maturity']))\n",
"dol = dol[dol['DU'] > 0].reset_index(drop=True)"
]
},
{
"cell_type": "code",
"execution_count": 6,
"id": "potential-change",
"metadata": {},
"outputs": [],
"source": [
"dol['PU'] = dol['PUAtual']/1000\n",
"dol_curve = dol[['DataRef', 'Maturity', 'DU', 'DC', 'PU']].copy()"
]
},
{
"cell_type": "code",
"execution_count": 7,
"id": "settled-polyester",
"metadata": {},
"outputs": [
{
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" 14 \n",
" 2021-11-01 \n",
" 2023-04-03 \n",
" 357 \n",
" 518 \n",
" 6.573809 \n",
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" 2021-11-01 \n",
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" \n",
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"
\n",
"
"
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"metadata": {
"needs_background": "light"
},
"output_type": "display_data"
}
],
"source": [
"dol_curve.plot(x='Maturity', y='PU', figsize=(20,6), style='-o',\n",
" ylabel='PU', xlabel='Date', title='U.S. Dollar Futures - 2021-11-01');"
]
},
{
"cell_type": "markdown",
"id": "virtual-heavy",
"metadata": {
"slideshow": {
"slide_type": "slide"
}
},
"source": [
"- We use the current U.S. Dollar exchange rate as the first point of the curve"
]
},
{
"cell_type": "code",
"execution_count": 9,
"id": "closed-uncle",
"metadata": {},
"outputs": [
{
"data": {
"text/html": [
"\n",
"\n",
"
\n",
" \n",
" \n",
" PTAX \n",
" \n",
" \n",
" date \n",
" \n",
" \n",
" \n",
" \n",
" 2021-10-29 \n",
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\n",
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\n",
"\n",
"
\n",
" \n",
" \n",
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" Maturity \n",
" DU \n",
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" PU \n",
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" 2022-01-03 \n",
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\n",
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"source": [
"dol.plot(x='Maturity', y='PU', figsize=(20,6), style='-o',\n",
" ylabel='PU', xlabel='Date', title='U.S. Dollar Futures - 2021-11-01');"
]
},
{
"cell_type": "markdown",
"id": "sonic-airplane",
"metadata": {
"slideshow": {
"slide_type": "slide"
}
},
"source": [
"### Pricing\n",
"\n",
"- From arbitrage theory the future price of U.S. exchance rage can be written as\n",
"\n",
"\n",
"$$\n",
"PTAX_{T-1} = PTAX_{t-1} \\frac{( 1 + r(t,T) )^{DU(t,T)/252}}{1 + c(t,T) \\cdot \\frac{DC(t,T)}{360}}\n",
"$$\n",
"\n",
"where\n",
"\n",
"- $t$: current instant of time (reference date)\n",
"- $T$: maturity date (date when the contract expires)\n",
"- $PTAX_{t-1}$ the exchange rate starting on the business day preceding $t$\n",
"- $PTAX_{T-1}$ the exchange rate starting on the business day preceding $T$\n",
"- $DC(t,T)$: the total number of days between $t$ e $T$\n",
"- $c(t,T)$: spot interest rate between reference date and contract maturity\n",
"- $r(t,T)$: risk free interest rate (DI1 Futures rates)\n"
]
},
{
"cell_type": "markdown",
"id": "seven-tunisia",
"metadata": {
"slideshow": {
"slide_type": "slide"
}
},
"source": [
"## DI x U.S. Dollar Spread Futures\n",
"\n",
"- This is an interest rate future on the spread between the **interest rate** and **the exchange rate variation**.\n",
"- This spread is called **CUPOM CAMBIAL**.\n",
"- The future is called **DDI** Future."
]
},
{
"cell_type": "markdown",
"id": "identical-contest",
"metadata": {
"slideshow": {
"slide_type": "slide"
}
},
"source": [
"### What is CUPOM CAMBIAL?\n",
"\n",
"\n",
"$$\n",
"1 + c(t,T) \\cdot \\frac{DC(t,T)}{360} = \\frac{\\Pi_{i=t}^{T}(1 + CDI_i)^{1/252}}{\\frac{PTAX_{T-1}}{PTAX_{t-1}}}\n",
"$$\n",
"\n",
"- The CUPOM CAMBIAL is calculated from the difference between:\n",
" - the compounded DI rates from an initial date $t$ and up to a date $T$ in the future.\n",
" - the exchange rate variation PTAX800 starting on the business day preceding $t$ and ending on the business day preceding $T$.\n",
"- This spread uses simple compounding with current days (360 days per year).\n",
"\n",
"\n",
"where\n",
"\n",
"- $c(t,T)$ is an exchange interest rate for U.S. Dollar (CUPOM CAMBIAL).\n",
"- $DC(t,T)$ is the total number of days between $t$ e $T$.\n",
"- $PTAX_{t-1}$ the exchange rate starting on the business day preceding $t$\n",
"- $PTAX_{T-1}$ the exchange rate starting on the business day preceding $T$\n"
]
},
{
"cell_type": "markdown",
"id": "acknowledged-salad",
"metadata": {
"slideshow": {
"slide_type": "subslide"
}
},
"source": [
"#### U.S. Dollar Exchange Rate Future Value\n",
"\n",
"- According to Arbitrage Pricing Theory\n",
"\n",
"\n",
"$$\n",
"PTAX_{T-1} = PTAX_{t-1} \\frac{( 1 + r(t,T) )^{DU(t,T)/252}}{1 + c(t,T) \\cdot \\frac{DC(t,T)}{360}}\n",
"$$\n",
"\n"
]
},
{
"cell_type": "markdown",
"id": "developing-equation",
"metadata": {
"slideshow": {
"slide_type": "slide"
}
},
"source": [
"### Pricing\n",
"\n",
"- The DDI Future is priced as a bullet bond.\n",
"\n",
"\n",
"$$\n",
"PU_{DDI}(t,T) = \\frac{100000}{1 + c(t,T) \\cdot \\frac{DC(t,T)}{360}}\n",
"$$\n",
"\n",
"where\n",
"\n",
"- $t$: current instant of time (reference date)\n",
"- $T$: maturity date (date when the contract expires)\n",
"- $DC(t,T)$: the total number of days between $t$ e $T$\n",
"- $c(t,T)$: spot interest rate between reference date and contract maturity\n",
"\n",
"\n",
"\n"
]
},
{
"cell_type": "code",
"execution_count": 14,
"id": "genuine-foundation",
"metadata": {
"slideshow": {
"slide_type": "slide"
}
},
"outputs": [],
"source": [
"ddi = df[(df['Mercadoria'] == 'DDI') &\n",
" (df['DataRef'] == pd.to_datetime('2021-11-01'))].reset_index(drop=True)"
]
},
{
"cell_type": "code",
"execution_count": 15,
"id": "hundred-hanging",
"metadata": {},
"outputs": [
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" \n",
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" 2021-11-01 \n",
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" 2022-09-01 \n",
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" \n",
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" \n",
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" \n",
" \n",
" 12 \n",
" 2021-11-01 \n",
" DDI \n",
" Z22 \n",
" 98271.09 \n",
" 99281.04 \n",
" 1009.95 \n",
" 2022-12-01 \n",
" 2022-12-01 \n",
" 395 \n",
" \n",
" \n",
" 13 \n",
" 2021-11-01 \n",
" DDI \n",
" F23 \n",
" 98131.84 \n",
" 99138.07 \n",
" 1006.23 \n",
" 2023-01-01 \n",
" 2023-01-02 \n",
" 427 \n",
" \n",
" \n",
" 14 \n",
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" 2023-07-01 \n",
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" 609 \n",
" \n",
" \n",
" 16 \n",
" 2021-11-01 \n",
" DDI \n",
" V23 \n",
" 96811.74 \n",
" 97823.96 \n",
" 1012.22 \n",
" 2023-10-01 \n",
" 2023-10-02 \n",
" 700 \n",
" \n",
" \n",
" 17 \n",
" 2021-11-01 \n",
" DDI \n",
" F24 \n",
" 96348.47 \n",
" 97298.60 \n",
" 950.13 \n",
" 2024-01-01 \n",
" 2024-01-02 \n",
" 792 \n",
" \n",
" \n",
" 18 \n",
" 2021-11-01 \n",
" DDI \n",
" J24 \n",
" 95891.87 \n",
" 96830.54 \n",
" 938.67 \n",
" 2024-04-01 \n",
" 2024-04-01 \n",
" 882 \n",
" \n",
" \n",
" 19 \n",
" 2021-11-01 \n",
" DDI \n",
" N24 \n",
" 95412.70 \n",
" 96316.44 \n",
" 903.74 \n",
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" 2024-07-01 \n",
" 973 \n",
" \n",
" \n",
" 20 \n",
" 2021-11-01 \n",
" DDI \n",
" V24 \n",
" 94860.29 \n",
" 95721.22 \n",
" 860.93 \n",
" 2024-10-01 \n",
" 2024-10-01 \n",
" 1065 \n",
" \n",
" \n",
" 21 \n",
" 2021-11-01 \n",
" DDI \n",
" F25 \n",
" 94333.25 \n",
" 95151.82 \n",
" 818.57 \n",
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" \n",
" \n",
" 22 \n",
" 2021-11-01 \n",
" DDI \n",
" J25 \n",
" 93806.32 \n",
" 94605.98 \n",
" 799.66 \n",
" 2025-04-01 \n",
" 2025-04-01 \n",
" 1247 \n",
" \n",
" \n",
" 23 \n",
" 2021-11-01 \n",
" DDI \n",
" N25 \n",
" 93349.45 \n",
" 94136.13 \n",
" 786.68 \n",
" 2025-07-01 \n",
" 2025-07-01 \n",
" 1338 \n",
" \n",
" \n",
" 24 \n",
" 2021-11-01 \n",
" DDI \n",
" V25 \n",
" 92852.42 \n",
" 93653.47 \n",
" 801.05 \n",
" 2025-10-01 \n",
" 2025-10-01 \n",
" 1430 \n",
" \n",
" \n",
" 25 \n",
" 2021-11-01 \n",
" DDI \n",
" F26 \n",
" 92339.55 \n",
" 93128.87 \n",
" 789.32 \n",
" 2026-01-01 \n",
" 2026-01-02 \n",
" 1523 \n",
" \n",
" \n",
" 26 \n",
" 2021-11-01 \n",
" DDI \n",
" J26 \n",
" 91916.14 \n",
" 92690.98 \n",
" 774.84 \n",
" 2026-04-01 \n",
" 2026-04-01 \n",
" 1612 \n",
" \n",
" \n",
" 27 \n",
" 2021-11-01 \n",
" DDI \n",
" N26 \n",
" 91400.18 \n",
" 92161.19 \n",
" 761.01 \n",
" 2026-07-01 \n",
" 2026-07-01 \n",
" 1703 \n",
" \n",
" \n",
" 28 \n",
" 2021-11-01 \n",
" DDI \n",
" V26 \n",
" 90959.74 \n",
" 91705.42 \n",
" 745.68 \n",
" 2026-10-01 \n",
" 2026-10-01 \n",
" 1795 \n",
" \n",
" \n",
" 29 \n",
" 2021-11-01 \n",
" DDI \n",
" F27 \n",
" 90419.84 \n",
" 91151.68 \n",
" 731.84 \n",
" 2027-01-01 \n",
" 2027-01-04 \n",
" 1890 \n",
" \n",
" \n",
" 30 \n",
" 2021-11-01 \n",
" DDI \n",
" F28 \n",
" 88407.09 \n",
" 89139.17 \n",
" 732.08 \n",
" 2028-01-01 \n",
" 2028-01-03 \n",
" 2254 \n",
" \n",
" \n",
" 31 \n",
" 2021-11-01 \n",
" DDI \n",
" F29 \n",
" 86348.93 \n",
" 87198.44 \n",
" 849.51 \n",
" 2029-01-01 \n",
" 2029-01-02 \n",
" 2619 \n",
" \n",
" \n",
" 32 \n",
" 2021-11-01 \n",
" DDI \n",
" F30 \n",
" 84188.92 \n",
" 85246.26 \n",
" 1057.34 \n",
" 2030-01-01 \n",
" 2030-01-02 \n",
" 2984 \n",
" \n",
" \n",
" 33 \n",
" 2021-11-01 \n",
" DDI \n",
" F31 \n",
" 82001.99 \n",
" 83049.38 \n",
" 1047.39 \n",
" 2031-01-01 \n",
" 2031-01-02 \n",
" 3349 \n",
" \n",
" \n",
" 34 \n",
" 2021-11-01 \n",
" DDI \n",
" F33 \n",
" 76893.80 \n",
" 77966.07 \n",
" 1072.27 \n",
" 2033-01-01 \n",
" 2033-01-03 \n",
" 4081 \n",
" \n",
" \n",
" 35 \n",
" 2021-11-01 \n",
" DDI \n",
" F35 \n",
" 71822.63 \n",
" 72930.33 \n",
" 1107.70 \n",
" 2035-01-01 \n",
" 2035-01-02 \n",
" 4810 \n",
" \n",
" \n",
" 36 \n",
" 2021-11-01 \n",
" DDI \n",
" F36 \n",
" 69282.50 \n",
" 70363.69 \n",
" 1081.19 \n",
" 2036-01-01 \n",
" 2036-01-02 \n",
" 5175 \n",
" \n",
" \n",
" 37 \n",
" 2021-11-01 \n",
" DDI \n",
" F37 \n",
" 66234.46 \n",
" 67270.73 \n",
" 1036.27 \n",
" 2037-01-01 \n",
" 2037-01-02 \n",
" 5541 \n",
" \n",
" \n",
"
\n",
"
"
]
},
"metadata": {
"needs_background": "light"
},
"output_type": "display_data"
}
],
"source": [
"ddi_curve.plot(x='Maturity', y='Rate', figsize=(20,6), style='-o',\n",
" ylabel='Rate', xlabel='Date', title='DDI Curve - 2021-11-01')\n",
"plt.axhline(y=0, ls='--', color='grey')\n",
"plt.show()"
]
},
{
"cell_type": "markdown",
"id": "retained-encounter",
"metadata": {
"slideshow": {
"slide_type": "slide"
}
},
"source": [
"- The curve starts with the first future, which matures in December."
]
},
{
"cell_type": "code",
"execution_count": 18,
"id": "continued-final",
"metadata": {
"slideshow": {
"slide_type": "-"
}
},
"outputs": [
{
"data": {
"text/html": [
"\n",
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" \n",
" \n",
" DataRef \n",
" Maturity \n",
" DC \n",
" Rate \n",
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" \n",
" \n",
" \n",
" 0 \n",
" 2021-11-01 \n",
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" 2022-01-03 \n",
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" -0.02035 \n",
" \n",
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" 2021-11-01 \n",
" 2022-02-01 \n",
" 92 \n",
" -0.01212 \n",
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" 2021-11-01 \n",
" 2022-03-02 \n",
" 121 \n",
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\n",
"
\n",
"\n",
"
\n",
" \n",
" \n",
" PTAX \n",
" \n",
" \n",
" date \n",
" \n",
" \n",
" \n",
" \n",
" 2021-10-29 \n",
" 5.6430 \n",
" \n",
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" 2021-11-01 \n",
" 5.6694 \n",
" \n",
" \n",
"
\n",
"
\n",
"\n",
"
\n",
" \n",
" \n",
" CDI \n",
" \n",
" \n",
" date \n",
" \n",
" \n",
" \n",
" \n",
" 2021-11-01 \n",
" 7.65 \n",
" \n",
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"
\n",
"
"
]
},
"metadata": {
"needs_background": "light"
},
"output_type": "display_data"
}
],
"source": [
"ddi_curve.plot(x='Maturity', y='Rate', figsize=(20,6), style='-o',\n",
" ylabel='Rate', xlabel='Date', title='DDI Curve - 2021-11-01')\n",
"plt.axhline(y=0, ls='--', color='grey')\n",
"plt.show()"
]
},
{
"cell_type": "markdown",
"id": "proprietary-membrane",
"metadata": {},
"source": [
"- This is the DDI Dirty Curve (Curva de CUPOM CAMBIAL SUJA)"
]
},
{
"cell_type": "code",
"execution_count": 24,
"id": "motivated-holder",
"metadata": {
"slideshow": {
"slide_type": "skip"
}
},
"outputs": [
{
"data": {
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\n",
"text/plain": [
""
]
},
"metadata": {
"needs_background": "light"
},
"output_type": "display_data"
}
],
"source": [
"ddi_hist = df[(df['Mercadoria'] == 'DDI') & (df['PUAtual'] != 100000.0)].copy()\n",
"ddi_hist['VencimentoAdj'] = ddi_hist['Vencimento'].map(MARKET_CALENDAR.following)\n",
"ddi_hist['DU'] = list(MARKET_CALENDAR.vec.bizdays(ddi_hist['DataRef'], ddi_hist['VencimentoAdj']))\n",
"ddi_hist['DC'] = list(ACTUAL_CALENDAR.vec.bizdays(ddi_hist['DataRef'], ddi_hist['VencimentoAdj']))\n",
"ddi_hist['Taxa'] = (100000 / ddi_hist['PUAtual'] - 1)/(ddi_hist['DC'] / 360)\n",
"ddi_hist_first = ddi_hist.groupby('DataRef').apply(lambda x: x.sort_values('DU').iloc[0])\n",
"ddi_hist_m1 = ddi_hist_first.set_index('DataRef')['Taxa']\n",
"ddi_hist_second = ddi_hist.groupby('DataRef').apply(lambda x: x.sort_values('DU').iloc[1])\n",
"ddi_hist_m2 = ddi_hist_second.set_index('DataRef')['Taxa']\n",
"ddi_hist_x = pd.concat((ddi_hist_m1, ddi_hist_m2), axis=1)\n",
"ddi_hist_x.columns = ('First maturity', 'Second maturity')\n",
"ddi_hist_x.plot(figsize=(15,6));"
]
},
{
"cell_type": "markdown",
"id": "first-river",
"metadata": {
"slideshow": {
"slide_type": "slide"
}
},
"source": [
"### Why DIRTY CUPOM CAMBIAL?\n",
"\n",
"#### Variability of CUPOM CAMBIAL\n",
"\n",
""
]
},
{
"cell_type": "markdown",
"id": "chemical-complaint",
"metadata": {
"slideshow": {
"slide_type": "slide"
}
},
"source": [
"### Why DIRTY CUPOM CAMBIAL?\n",
"\n",
"$$\n",
"\\frac{PTAX_{t}}{PTAX_{t-1}} = \\frac{(1 + CDI_t)^{DU(t,t+1)/252}}{1 + c(t,t+1) \\cdot \\frac{DC(t,t+1)}{360}}\n",
"$$\n",
"\n",
"- What does happen when it goes from $t \\rightarrow T$?\n",
"\n",
"$$\n",
"\\frac{PTAX_{T-1}}{PTAX_{t-1}} = \\frac{(1 + CDI(t,T))^{DU(t,T)/252}}{1 + c(t,T) \\cdot \\frac{DC(t,T)}{360}}\n",
"$$\n",
"\n",
"- The residual effect of the *shift* in the exchange rate goes to the only available parameter, that is $c(\\cdot)$.\n",
"\n",
"#### Solution\n",
"\n",
"- **Dólar CUPOM LIMPO**"
]
},
{
"cell_type": "markdown",
"id": "motivated-consortium",
"metadata": {
"slideshow": {
"slide_type": "slide"
}
},
"source": [
"### Dólar Cupom Limpo\n",
"\n",
"- Dólar Cupom Limpo *cleans* the DDI curve removing the effect of the 1-day dollar return.\n",
"- Dólar Cupom Limpo is obtained from Casado de Dólar.\n",
" - Casado de Dólar is an strututured product\n",
"- Dólar Cupom Limpo is a U.S. Dollar exhange rate traded in the market with settlement in two business days (d+2).\n",
"\n",
"$$\n",
"PTAX_{t} = PTAX_{t-1} \\frac{(1 + CDI_t)^{DU(t,t+1)/252}}{1 + CS(t,t+1) \\cdot \\frac{DC(t,t+1)}{360}}\n",
"$$\n",
"\n",
"and\n",
"\n",
"$$\n",
"PTAX_{t} = DOCL_{t} \\frac{(1 + CDI_t)^{DU(t,t+1)/252}}{1 + CL(t,t+1) \\cdot \\frac{DC(t,t+1)}{360}}\n",
"$$\n",
"\n",
"where\n",
"\n",
"- $CS(t,t+1)$ stands for CUPOM SUJO\n",
"- $CL(t,t+1)$ stands for CUPOM LIMPO"
]
},
{
"cell_type": "markdown",
"id": "enormous-clear",
"metadata": {
"slideshow": {
"slide_type": "slide"
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},
"source": [
"$$\n",
"\\frac{DOCL_{t}}{1 + CL(t,t+1) \\cdot \\frac{DC(t,t+1)}{360}} = \\frac{PTAX_{t-1}}{1 + CS(t,t+1) \\cdot \\frac{DC(t,t+1)}{360}}\n",
"$$\n"
]
},
{
"cell_type": "markdown",
"id": "mobile-hollow",
"metadata": {
"slideshow": {
"slide_type": "-"
}
},
"source": [
"\n",
"- B3 informs daily\n",
"\n",
""
]
},
{
"cell_type": "markdown",
"id": "together-surge",
"metadata": {
"slideshow": {
"slide_type": "slide"
}
},
"source": [
"## Forward Rate Agreement on DI x U.S. Dollar Spread - FRC\n",
"\n",
"- This future trades the forward DI x U.S. Dollar Spread Rate from the expiration date of the short DI x U.S. Dollar Spread Futures (short leg - first maturity) to the expiration date of long DI x U.S. Dollar Spread Futures (long leg).\n",
"- This future is called **FRC** Future.\n",
"- Since two contracts are traded, the quotation is defined in terms of the forward rate\n",
"\n",
"$$\n",
"1 + c_{FRC}(T_s, T_l) \\cdot \\frac{DC(t,T_l)-DC(t,T_s)}{360} = \\frac{1 + c(t, T_l) \\cdot \\frac{DC(t,T_l)}{360}}{1 + c(t, T_s) \\cdot \\frac{DC(t,T_s)}{360}}\n",
"$$\n"
]
},
{
"cell_type": "code",
"execution_count": 25,
"id": "composed-passenger",
"metadata": {
"slideshow": {
"slide_type": "slide"
}
},
"outputs": [],
"source": [
"frc = df[(df['Mercadoria'] == 'FRC') &\n",
" (df['DataRef'] == pd.to_datetime('2021-11-01'))].copy()"
]
},
{
"cell_type": "code",
"execution_count": 26,
"id": "exposed-diamond",
"metadata": {
"slideshow": {
"slide_type": "-"
}
},
"outputs": [],
"source": [
"frc['Maturity'] = frc['Vencimento'].map(MARKET_CALENDAR.following)\n",
"frc['DU'] = frc.apply(lambda x: MARKET_CALENDAR.bizdays(x['DataRef'], x['Maturity']), axis=1)\n",
"frc['DC'] = frc.apply(lambda x: ACTUAL_CALENDAR.bizdays(x['DataRef'], x['Maturity']), axis=1)\n",
"frc = frc[frc['DU'] > 0].reset_index(drop=True)"
]
},
{
"cell_type": "code",
"execution_count": 27,
"id": "voluntary-fairy",
"metadata": {},
"outputs": [
{
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"source": [
"frc_curve = frc[['DataRef', 'Maturity', 'DC', 'Rate']].copy()\n",
"frc_curve.plot(x='Maturity', y='Rate', figsize=(20,6), style='-o',\n",
" ylabel='Rate', xlabel='Date', title='FRC Curve - 2021-11-01')\n",
"plt.show()"
]
}
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