The increase in the area of sea surface depends on the geometry o

The increase in the area of sea surface depends on the geometry of the surface waves. In order to estimate this increase in sea area we first discuss regular surface waves. Let us consider the ocean surface (without waves) in the form of a rectangle with dimensions a and b, where a lies parallel

to the x axis and b is parallel to the y axis. Panobinostat The area of the surface is therefore S0 = a × b. How will the area of this sea surface change when a regular wave of height H and length L propagates in the direction of the x axis? As the crest of a regular wave is parallel to the y axis, the sea surface elevation for a given time t = 0 is equation(71) ζ(x)=H2cos(2πxL).The area of a wind-roughened surface can therefore be given by equation(72) S=l b,S=l b,in which l is the length of the arc of the wave profile, when we intersect the Dasatinib manufacturer sea surface by a vertical plane parallel to the x axis within the limits from x = 0 to x = a. The length arc l becomes (Abramowitz & Stegun 1975) equation(73) l=∫0a1+(∂ζ(x)∂x)2dx.After substituting eq. (73) in eq. (72) we get equation(74) S=Lb2π∫0ka1+(kH2)2sin2(u) du,in which k is the wave number k = 2π/L. The exact solution

of equation (74) is expressed in the form of an elliptic integral of the second kind (Abramowitz & Stegun 1975), which cannot be obtained analytically. However, as the quantity kH/2 = πH/L is usually very small, we can expand the function under the integral into a Taylor series as follows: equation(75) 1+(kH2)2sin2u≈1+12(kH2)2sin2(u)−18(kH2)2sin4(u)+⋯As we are dealing with regular waves, we can

restrict ourselves to one wave length and thus take a = L (ka = 2π). Using this in eq. (74), we obtain equation(76) S=Lb[1+14(kH2)2−364(kH2)4+⋯].Therefore, the relative increase in the sea surface area becomes equation(77) δ=(S−S0)/S0=[14(kH2)2−364(kH2)4+ ⋯].The relative increase in sea surface area δ = (S – S0)/S0 (in %) as a function of wave steepness H/L is illustrated in Figure 6. Let us now assume that two regular surface waves of heights H1 and H2, and lengths L1 and L2 are propagating in two different directions θ1 and θ2. The resulting surface Amobarbital elevation takes the form equation(78) ζ(x, y, t)=H12cos[2πL1(x cosθ1+y sinθ1)−ω1t]++H22cos[2πL2(x cosθ2+y sinθ2)−ω2t],and the area of wave surface is now (Abramowitz & Stegun 1975) equation(79) S=∫0a∫0b1+(∂ζ∂x)2+(∂ζ∂y)2dy dx,in which a and b are the dimensions of a sea surface area without waves. Figure 7 presents the relative increase in sea surface area δ = (S – S0)/S0 as a function of the angle propagation difference(θ1 – θ2) for short waves (H1 = H2 = 1 m, T1 = T2 = 4 s). The maximum increase in sea area (about 6%) is observed for waves propagating in the same or in opposite directions.

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