math/exponential__log_8hpp_source.html

#ifndef STAN_MATH_PRIM_PROB_EXPONENTIAL_LOG_HPP

#define STAN_MATH_PRIM_PROB_EXPONENTIAL_LOG_HPP


#include <stan/math/prim/meta.hpp>

#include <stan/math/prim/prob/exponential_lpdf.hpp>


namespace stan {

namespace math {


template <bool propto, typename T_y, typename T_inv_scale>

return_type_t<T_y, T_inv_scale> exponential_log(const T_y& y,

                                                const T_inv_scale& beta) {

  return exponential_lpdf<propto, T_y, T_inv_scale>(y, beta);

}


template <typename T_y, typename T_inv_scale>

inline return_type_t<T_y, T_inv_scale> exponential_log(

    const T_y& y, const T_inv_scale& beta) {

  return exponential_lpdf<T_y, T_inv_scale>(y, beta);

}


}  // namespace math

}  // namespace stan

#endif

stan::math::exponential_log
return_type_t< T_y, T_inv_scale > exponential_log(const T_y &y, const T_inv_scale &beta)
Definition exponential_log.hpp:14

stan::return_type_t
typename return_type< Ts... >::type return_type_t
Convenience type for the return type of the specified template parameters.
Definition return_type.hpp:218

stan::math::beta
fvar< T > beta(const fvar< T > &x1, const fvar< T > &x2)
Return fvar with the beta function applied to the specified arguments and its gradient.
Definition beta.hpp:51

stan
The lgamma implementation in stan-math is based on either the reentrant safe lgamma_r implementation ...
Definition fvar.hpp:9

meta.hpp

exponential_lpdf.hpp