We assume that the intermittent sampling intervals in space are bounded.
The sampling intervals in space may be bounded and variable, x_{j + 1} - x_{j} le Delta.
Firstly, we observe that in SIS2 the per-partnership transmission probability from male to female (βf, posterior median 0.806 and the 95% Highest Posterior Density (HPD) interval, i.e. the shortest interval in parameter space which contains 95% of the distribution, (0.514-0.999)) is higher than that from female to male (βm, posterior median 0.59, 95% HPD interval 0.248-0.961)).
In addition, as an application, we discuss the existence of solutions of initial value problems for nth-order nonlinear integro-differential equations of mixed type on an infinite interval in Banach spaces.
Specifically we initially searched a large parameter space defined by U in the interval [0.1; 12.0] and s in the interval [0.01; 1.0], in spaces of 0.05 for each of the parameters.
Motivated by above papers, we consider the following singular -point boundary value problem on an infinite interval in a Banach space (1.2).
Trajectories are first discretized at regular intervals, in both space and time.
Aiming at the problems of traditional buried tube nitrogen injection that the nitrogen injection spot with intervals in the space causes the failure of continuous nitrogen distribution in goaf, leading to poor inert effect, in addition, the un-recycling of the nitrogen injection pipe causes much resource waste.
However, it is difficult to retrieve the k intervals in linear space.
The cone theory together with Mönch fixed point theorem and a monotone iterative technique is used to investigate the positive solutions for some boundary problems for systems of nonlinear second-order differential equations with multipoint boundary value conditions on infinite intervals in Banach spaces.
