Traveling waves and entire solutions for an epidemic model with asymmetric dispersal

This paper is concerned with traveling waves and entire solutions of one epidemic model with asymmetric dispersal kernel function arising from the spread of an epidemic by oral-faecal transmission. The asymmetry of the kernel function will have an influence on two aspects: (i) the minimal wave speed of traveling wave fronts may be nonpositive, but we give a new restrictive condition on the kernel function to guarantee it is positive; (ii) the two traveling wave solutions with the same speed spreading from right and left of x-axis may be different in shape, which further makes that the entire solutions with five or four parameters may be asymmetric and the entire solutions with three parameters increasing in x may be different from those decreasing in x in shape. As for traveling wave solutions, we get the existence, asymptotic behavior and uniqueness of the two traveling wave solutions spreading from right and left of x-axis, respectively. We further construct three new entire solutions with five, four or three parameters. Two comparison principles also be established.