fit_to_option_market_df

A function for computing present values to
time <code>t</code> of various cashflows occurring during this timestep, with
arguments <code>T</code>, <code>t</code>

discount_factor_fcn

A data frame of American option details. It should
have columns <code>callput</code>, <code>K</code>, <code>time</code>,
<code>mid</code>, <code>bid</code>, and <code>ask</code>,

options_df

Minimum option maturity to allow in calibration

min_maturity

Maximum option strike as a proportion of S0 to allow in calibration

min_moneyness

Maximum option strike as a proportion of S0 to allow in calibration

max_moneyness

Overall default intensity (in natural units)

base_default_intensity

This is a convenience function for calibrating variance cumulation (the
 at-the-money volatility of the continuous process) and equity linked default
 intensity of the form $h(s + (1-s)(S0/S_t)^p)$, using a <code>data.frame</code> of
 option market data.

Algorithms to price American and European
equity options, convertible bonds and a
variety of other financial derivatives. It uses an
extension of the usual Black-Scholes model in which
jump to default may occur at a probability specified
by a power-law link between stock price and hazard
rate as found in the paper by Takahashi, Kobayashi,
and Nakagawa (2001) <doi:10.3905/jfi.2001.319302>. We
use ideas and techniques from Andersen and
Buffum (2002) <doi:10.2139/ssrn.355308> and
Linetsky (2006) <doi:10.1111/j.1467-9965.2006.00271.x>.

fit_to_option_market_df: Calibrate volatilities and equity-linked default intensity making many assumptions

Description

Usage

Arguments

See Also