MATHEMATICAL MODELING OF THE COVERING OPTIMIZATION OF THE ROUND BUILDINGS IN A PLAN WITH A RADIAL BEAM POSITION

A. Yanin, S. Novikova
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Abstract

The article presents the results of optimization of the angle between radial beams in the floor of a circular building in the plan. On the one hand, they rest on the central post, and on the other, on vertical supporting structures along the circle. Steel decking is laid on the beams. The angle between the beams is determined so that the mass of the beam and the deck is minimal. This angle is considered optimal. To solve the problem, the target function of the cost of flooring and radial beams per unit floor area is used. This function depends on the angle between the beams. Using mathematical methods of differentiation, the minimum of the objective function and the corresponding value of the optimal angle were found. The thickness of the flooring was determined on the basis of ensuring its rigidity. It is assumed that composite welded radial beams have I-beams with two axes of symmetry. The height of the beam corresponds to the equality of the areas of the shelves and the wall. The problem of determining the optimal angle between the beams was solved on the basis of ensuring the strength of the beams under normal stresses. In the design diagram of the beam, a triangular distributed load is adopted. The dimensions of the cross-section of the beam were determined based on the equality of the required and actual moments of resistance, and were included in the target cost function. The study took into account that the deflection of the beam at the optimal angle between them can exceed the limiting standard value. Based on the solution of the system of equations of strength and stiffness, a formula is obtained for the minimum angle between the beams from the stiffness condition. The carried out mathematical studies have shown that at the optimal angle between the beams, it is possible to ensure its rigidity. This is possible when the flexibility of the beam wall exceeds a certain minimum value. Analysis of the formula for the minimum value of the wall flexibility showed that it is proportional to the design steel resistance to the sixth power. Therefore, to ensure that the deflection of the beam does not exceed the limiting value at the optimum angle, it is necessary to use low strength steel. To confirm the practical feasibility of using the proposed method, the problem was solved with certain numerical data. The results obtained have confirmed that the problem has a practical meaning at a relatively low steel strength. In addition, it turned out that the optimal angle between the beams does not depend on its span.
径向梁位置平面下圆形建筑覆盖优化的数学建模
本文介绍了在平面设计中对某圆形建筑楼面径向梁夹角进行优化的结果。一方面,它们靠在中心柱子上,另一方面,靠在沿着圆圈的垂直支撑结构上。钢甲板铺设在横梁上。梁之间的角度是确定的,使梁和甲板的质量是最小的。这个角度被认为是最佳的。为了解决这一问题,采用了单位楼面面积楼板和径向梁成本的目标函数。这个函数取决于光束之间的角度。利用数学微分法求出目标函数的最小值和最佳角度的对应值。地板的厚度是在保证其刚性的基础上确定的。假设复合焊接径向梁具有两对称轴的工字梁。梁的高度对应于架子和墙的面积相等。在保证梁在正常应力作用下的强度的基础上,解决了梁间最佳角度的确定问题。在梁的设计简图中,采用三角形分布荷载。梁的截面尺寸根据所需阻力矩和实际阻力矩的相等来确定,并包含在目标成本函数中。考虑到梁与梁在最佳夹角处的挠度会超过限定标准值。在求解强度和刚度方程组的基础上,从刚度条件出发,得到了梁间最小夹角的计算公式。进行的数学研究表明,在梁与梁之间的最佳角度下,可以保证其刚度。当梁墙的柔韧性超过某个最小值时,这是可能的。对墙体柔韧性最小值公式的分析表明,其与设计钢抗力的六次方成正比。因此,为保证梁的挠度在最佳角度下不超过限制值,有必要采用低强度钢。为了验证所提方法的实际可行性,用一定的数值数据进行了求解。结果表明,在钢强度较低的情况下,该问题具有实际意义。此外,结果表明,梁间的最佳角度不依赖于其跨度。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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