IHSEP-package           Inhomogeneous Self-exciting Process
asep                    An IHSEP data set
conv.seq                Sequence convolution conv.seq calculates the
                        convolution of two sequences
h.fn                    Mean Intensity Function of the Self-Exciting
                        Point Process 'h.fn' calculate the values of
                        the mean intensity function of the
                        self-exciting process with given baseline event
                        rate and excitation function at a (fairly
                        large) number of points. Values of the function
                        at other points can be obtained by
                        interpolation (e.g. spline interpolation).
h.fn.exp                Mean Intensity of the Self-Exciting Point
                        Process With an Exponential Excitation Function
                        'h.fn.exp' calculates the mean intensity
                        function h(t) which solves the integral
                        equation h(t)=nu(t)+\int_0^t g(t-s)h(s)ds, t>=q
                        0 , where the excitation function is
                        exponential: g(t)= gamma_1 e^{-gamma_2 t}.
mloglik0                Minus loglikelihood of an IHSEP model
mloglik1a               Minus loglikelihood of an IHSEP model
mloglik1b               Minus loglikelihood of an IHSEP model
mloglik1c               Minus loglikelihood of an IHSEP model
mloglik1d               Minus loglikelihood of an IHSEP model
mloglik1e               Minus loglikelihood of an IHSEP model
sepp.resid              Calculate the self exciting point process
                        residuals
simHawkes0              Simulate a Hawkes process, or Self-exciting
                        point process
simHawkes1              Simulate a Hawkes process, or Self-exciting
                        point process
simPois                 Simulate a Poisson process
simPois0                Simulate a Poisson process
